A cantilever probe-based instrument is controlled to counteract the lateral loads imposed on the probe as a result of probe sample interaction. The probe preferably includes an active cantilever, such as a so-called bimorph cantilever. Force counteraction is preferably achieved by monitoring a lateral force-dependent property of probe operation such as cantilever free end deflection angle and applying a voltage to at least one of the cantilever and one or more separate actuators under feedback to maintain that property constant as the probe-sample spacing decreases. The probe could further uses at least one of contact flexural and torsional resonances characteristics to determine contact and release points. With the knowledge of the tip profile, quantitative mechanical data for probe sample interaction can be obtained.
|
1. A method comprising:
causing a probe to interact with a sample, and, during the probe-sample interaction
i. monitoring probe reaction to the interaction, and
ii using information obtained from the monitoring step as feedback to maintain a lateral-force dependent characteristic parameter of the probe at least essentially constant to thereby counteract lateral forces imposed on the probe during the probe-sample interaction.
34. An instrument comprising:
(A) a probe; and
(B) means for
i causing the probe to interact with a sample, and,
while the probe interacts with the sample,
a monitoring probe reaction to the interaction, and
b. using information obtained from the monitoring step as feedback, maintaining a lateral-force dependent probe characteristic parameter of the probe at least essentially constant to thereby counteract lateral forces imposed on the probe during the probe-sample interaction.
14. A method comprising:
(A) indenting a sample with a tip of a probe, the tip being mounted on an active cantilever having a free end and a base; and
(B) during the indentation process,
i. monitoring probe reaction to the interaction, and
ii. using information obtained from the monitoring step as feedback energizing at least one of the active cantilever and a separate actuator to maintain at least one lateral-force dependent characteristic parameter of the cantilever at least generally constant, thereby to at least substantially completely counteract lateral forces imposed on the tip by the sample by the probe-sample interaction.
17. An instrument comprising:
(A) a probe including an active cantilever having a base and a free end;
(B) a z position actuator that drives at least one of the probe and a sample support to move in a z direction to alter a probe/sample spacing; and
(C) a controller that, while the probe interacts with the sample, uses a closed loop feedback process to control at least one of the cantilever and the z position actuator to maintain a lateral-force dependent characteristic parameter of the probe at least essentially constant so as counteract lateral forces imposed on the probe during the probe-sample interaction the feedback control process using information obtained from monitoring reaction of the probe to the interaction as feedback.
4. The method of
5. The method of
7. The method of
8. The method of
10. The method of
11. The method of
12. The method of
13. The method of
15. The method of
16. The method of
18. The instrument of
19. The instrument of
20. The instrument of
21. The instrument of
22. The instrument of
23. The instrument of
24. The instrument of
25. The instrument of
26. The instrument of
27. The instrument of
28. The instrument of
29. The instrument of
30. The instrument of
31. The instrument of
32. The instrument of
33. The instrument of
35. The instrument of
|
This application claims priority under 35 U.S.C. §119(e) to U.S. provisional Application Ser. No. 60/562,116, filed Apr. 14, 2004 and entitled “Method and Apparatus for Obtaining Quantitative Measurements Using a Probe Based Instrument”, the contents of which are hereby incorporated by reference in their entirety.
1. Field of the Invention
The present invention is directed to probe-based instruments and, more particularly, relates to a method and apparatus for facilitating high speed dynamic and quasi-static measurements using such an instrument. In a particularly preferred embodiment, the invention relates to the control of such an instrument to reduce or minimize lateral forces on the probe in order, e.g., to facilitate quantitative indentation measurements on the nanoscale. The invention additionally relates to the taking of indentation measurements using a probe based instrument.
2. Description of Related Art
Several probe-based instruments monitor the interaction between a cantilever-based probe and a sample to obtain information concerning one or more characteristics of the sample. For example, scanning probe microscopes (SPMs) typically characterize the surface of a sample down to atomic dimensions by monitoring the interaction between the sample and a tip on the cantilever probe. By providing relative scanning movement between the tip and the sample, surface characteristic data can be acquired over a particular region of the sample, and a corresponding map of the sample can be generated.
The atomic force microscope (AFM) is a very popular type of SPM. The probe of the typical AFM includes a very small cantilever which is fixed to a support at its base and which has a sharp probe tip attached to the opposite, free end. The probe tip is brought very near to or into contact with a surface of a sample to be examined, and the deflection of the cantilever in response to the probe tip's interaction with the sample is measured with an extremely sensitive deflection detector, often an optical lever system such as described in Hansma et al. U.S. Pat. No. RE 34,489, or some other deflection detector such as strain gauges, capacitance sensors, etc. The probe is scanned over a surface using a high-resolution three axis scanner acting on the sample support and/or the probe. The instrument is thus capable of creating relative motion between the probe and the sample while measuring the topography, elasticity, or some other surface property of the sample as described, e.g., in Hansma et al. U.S. Pat. No. RE 34,489; Elings et al. U.S. Pat. No. 5,226,801; and Elings et al. U.S. Pat. No. 5,412,980.
AFMs may be designed to operate in a variety of modes, including contact mode and oscillating mode. In contact mode operation, the microscope typically scans the tip across the surface of the sample while keeping the force of the tip on the surface of the sample generally constant. This effect is accomplished by moving either the sample or the probe assembly vertically to the surface of the sample in response to sensed deflection of the cantilever as the probe is scanned horizontally across the surface. In this way, the data associated with this vertical motion can be stored and then used to construct an image of the sample surface corresponding to the sample characteristic being measured, e.g., surface topography. Alternatively, some AFMs can at least selectively operate in an oscillation mode of operation such as TappingMode™ (TappingMode is a trademark of Veeco Instruments, Inc.) operation. In TappingMode™ operation the tip is oscillated at or near a resonant frequency of the cantilever of the probe. The amplitude or phase of this oscillation is kept constant during scanning using feedback signals, which are generated in response to tip-sample interaction. As in contact mode, these feedback signals are then collected, stored, and used as data to characterize the sample.
Regardless of their mode of operation, AFMs can obtain resolution down to the atomic level on a wide variety of insulating or conductive surfaces in air, liquid or vacuum by using piezoelectric scanners, optical lever deflection detectors, and very small cantilevers fabricated using photolithographic techniques. Because of their resolution and versatility, AFMs are important measurement devices in many diverse fields ranging from semiconductor manufacturing to biological research.
One potentially problematic characteristic of AFMs and other probe-based instruments lies in the inability to obtain some types of nanomechanical quantitative measurements at sufficiently high speeds and/or with sufficient accuracy to meet the ever increasing demands of industry and science.
For example, AFM's have traditionally been incapable of obtaining precise quantitative measurement of some mechanical properties. This inability is increasingly problematic because the demand for such measurements is rapidly increasing. For instance, polymers are being used with increasing frequency in the semiconductor industries as “low-k dielectrics” to fill the gaps or trenches in capacitors used in memory devices. The low-k dielectrics may have a width of 100 nanometers or less. It is often desirable to determine the mechanical properties of these materials.
As another example, nanophase materials such as “block copolymers” (formed from blends of two highly dissimilar polymers) are being used in a variety of applications. It is often desirable to measure the composition and structure of these materials on the nanometer scale. Both types of measurement require the acquisition of data obtained from an indentation measurement performed by monitoring the response of a probe as the probe indents the sample surface. The resultant data can be used to determine elasticity modulus, plastic deformation, and other mechanical characteristics. Prior AFM's can obtain qualitative indentation measurements using a so-called “compositional imaging” technique, but could not obtain quantified measurements.
Several hurdles prevent the transformation of traditional qualitative instruments into high speed and high bandwidth quantitative tools for these nanomechanical quantitative measurements. It has been discovered that one of the key barriers arises from lateral forces that are applied to the probe as result of cantilever bending. To apply a force to the sample for the purposes of, e.g., obtaining an indentation measurement, the fixed end of the cantilever is moved vertically through a distance Δz with the tip in contact with the sample. The resultant cantilever bending generates a force k·Δz, where k is the spring constant of the cantilever. This force is not, however, applied normal to the cantilever. A component of the force instead is imposed laterally or along the length of the cantilever. This component was historically deemed to be non-problematic because the lateral component of the applied force vector is typically assumed to be much smaller than the normal component. However, it has been discovered that the lateral force can in fact be an order of magnitude higher than the normal force.
The reasons for this somewhat counterintuitive characteristic of AFM operation can be appreciated from
It has also been discovered that mounting the probe P horizontally to reduce the angle α to zero does not eliminate the lateral forces on the cantilever C because of the intrinsic asymmetry of the cantilever probe configuration. The imposition of the unintended lateral force on the cantilever C causes a host of problems, including lateral motion of the tip T during indenting, convolution of frictional effects with elastic properties, and non-axially symmetric application of the indenting force.
Some current AFM indentation tools attempt to reduce the lateral forces on a probe by moving the probe laterally away from the indentation point as the probe-sample spacing decreases. The control of this movement is open-loop based upon historical data. It assumes the absence of hysteresis and a constant cantilever angle. Both assumptions usually prove inaccurate in practice, resulting in less than optimal lateral force counteraction.
Axially symmetric indenters have been developed. However, these instruments have low mechanical bandwidth (on the order of 300 Hz) and relatively poor sensitivity because these are subject to high levels of noise. For instance, MTS and Hysitron produce nano-indentation devices in which an indenter tip such as a Berkovich tip is driven into a sample using a multi-plate capacitor transducer system. The device has drive and pickup plates mounted on a suspension system. It provides relative movement between the plates when the forces applied to the pickup plates drive the probe into contact with the sample. The change in space between the plates provides an accurate indication of the probes vertical movement. The input actuation forces and vertical position readout are therefore all-decoupled, resulting in a generally purely symmetrical indentation process. In practice, the sensor element is mounted on a scanning tunnel microscope, and a sample is mounted on the sensor. The force sensor then can be used for both measuring the applied force during micro indentation or micro hardness testing and for imaging before and after the testing to achieve an applied AFM-type image of the surface before and after the indentation process. Systems of this type are described, e.g., in U.S. Pat. No. 5,576,483 to Bonin and U.S. Pat. No. 6,026,677 to Bonin, both assigned to Hysitron Incorporated.
While the indenter described above provides axially symmetric indentation, it has a very low bandwidth because of the relatively large mass of the capacitive plates. The instrument also cannot obtain an accurate image of indentations, particularly in relatively elastic samples, because of sample rebound between the indentation and image acquisition passes and because of the large tip radius inherent in the indenter tip. It also has relatively poor force sensitivity, on the order of 15 nano-Newtons, as opposed to a few pico-Newtons for a true AFM having a much smaller tip.
Other obstacles have also heretofore prevented AFM-based quantitative indentation measurements.
For instance, prior AFM-based indenters, like other indenters, indented the sample and acquired indentation data in two separate steps. That is, the sample is first indented using a probe to create an indent. Then, after the probe is removed from the indent, a raster scan or similar scanning technique is used to image the indent. However, the acquired image does not accurately reflect the indent for at least two reasons. First, the tip cannot accurately reflect deformation geometry. Second, an elastic material will at least partially recover or “rebound” between the indentation and imaging passes, resulting in partial disappearance of the indentation. In the worst case scenario of a near perfectly elastic sample surface, the indentation will nearly completely disappear between the indentation and imaging passes.
For instance, the displacement of a material in response to a given load provides useful information regarding property characteristics, including elastic modulus Esample and the plastic deformation. Loads are typically imposed by indenting a sample surface with a probe and measuring properties of the resulting indentation. The sample is indented through an indentation cycle having a “loading phase” in which the tip is driven into and indents the sample surface and a subsequent “unloading phase” in which the tip is withdrawn from the sample surface.
The load-displacement relationship resulting from an indentation cycle is expressed in the form of Hook's law for indentation induced deformations. Hook's law, which expresses the relationship between force and deformation, is expressed as follows:
L=a(hmax−hf)m (1)
where:
During a typical indentation cycle, the loading probe will indent the sample to hmax at the end of the loading phase when the applied load is the highest. Then, during the unloading phase, the unloading probe will separate from the bottom of the indentation at a release point Pr above the point Pmax located at the lower limit of hmax. The derivative of equation (1) is called contact stiffness, S. S at any given depth h during deformation can be expressed as:
The static contact stiffness for an entire indentation cycle can be expressed as:
If lateral forces on the tip are counterbalanced, ΔL can be easily determined simply by detecting the vertical load, Lmax, at the end of the loading phase of the indentation cycle. Δh can be determined by subtracting the maximum penetration point Pmax from the initial contact point, Pic, where the probe first engages the sample surface. Pmax can be measured directly using conventional monitoring techniques. Pic measurements are more difficult, and are part of a preferred embodiment of the invention.
S is dependent upon material properties as follows:
where
The relationship between the elastic modulus of the Esample and Er can be expressed as follows:
where:
Poisson ratios vary only minutely from material to material, so Vsample can be assumed to be close to Vtip, which is a known constant C for a known tip material. Hence, equation 5 can, as a practical matter, be reduced to:
Referring again to Equation (4), Er can be determined from a measured contact area Acon using the equation:
Hence combining equations (6) and (7), the sample elastic modulus Esample can be determined as follows:
Practically speaking, the greatest challenge for quantitative mechanical measurements is to measure the contact area, Acon, which is a function of the actual contact depth, hact, and the tip shape. The actual contact depth usually is not the same as the penetration depth, hmax, because a sample having any elasticity will deform away from the tip at the upper portion of the indentation, leaving a space, hs, between the upper limit of the hcact and the initial contact point Pic, as can be appreciated from
In addition, the lower limit of hcact, being the point of separation of the apex of the tip from the bottom of indentation during the unloading phase of the indentation cycle (hereafter referred to as the “release point”, Pr), is not the same as the deepest penetration point Pmax. This is because a sample having any significant elasticity will rebound as the tip is being withdrawn from the sample, resulting in a Pr that is above Pmax as seen in
A determination of hcact therefore requires a determination of the location of both the release point Pr where the apex of unloading tip first separates from the bottom of the rebounding indent, and the upper separation point, Psep, where no portion of the unloading tip contacts the detent.
The initial contact point, Pic, is often determined simply by determining the location at which the force imposed on the loading cantilever markedly changes during the loading phase of the indentation cycle. Referring to the force displacement curves 15 and 18 of
A need therefore exists for a more accurate detection of initial contact point Pic, particularly in the case of indenting relatively soft samples.
Prior systems also have difficulty determining the release point, Pr, and the actual contact depth, hcact during indentation because material measurements are taken in a separate scanning operation sometime after the tip is removed from the indented sample. If the sample is relatively elastic or viscoelastic, creep, defined as changes in elastic deformation over time, will alter both the depth and area of the indent as the sample rebounds toward its original shape following initial tip removal.
In summary a quantitative mechanical property determination with cantilever probe based AFM the following aspects should be adequately addressed:
1. The load must be well defined. Since the cantilever sensor is primarily a flexural sensor, the lateral force along the cantilever axis is unknown and should be counteracted prior to determining load.
2. Contact points, including initial contact point, Pic, the release point, Pr, and the separation point, Psep, should be accurately measured.
3. With the knowledge of the tip shape, the contact area can be determined quantitatively.
Furthermore, the need has broadly arisen to provide a probe based instrument that is capable of obtaining high speed, high bandwidth quantitative measurement of mechanical properties through indentation and other interactions. It is believed that in order to meet these needs, the lateral component of AFM based indentation needs to be reduced by 2 to 3 orders of magnitude than is usually achievable using current techniques.
Partially in order to meet the above-identified need, and partially in order to achieve other benefits like more controlled tip-sample interaction, the need has also arisen to effectively and reliably counteract the lateral forces imposed on a probe as a result of probe-sample interaction.
In accordance with a first aspect of the invention, one or more the above-identified needs is met by providing a probe-based instrument that can be controlled to counteract the lateral loads on the probe as a result of probe sample interaction. In a preferred embodiment, the probe includes an active cantilever, such as a so-called “bimorph” cantilever, that can be energized to deflect without a force being applied to either the base or the free end of the cantilever. Force counteraction is preferably achieved by monitoring a lateral force-dependent property of probe operation and applying a voltage to the cantilever and/or one or more separate actuators under feedback to maintain that property constant as the probe-sample spacing decreases. The monitored property preferably comprises cantilever free end deflection angle.
A preferred aspect of this invention also addresses contact points and contact area determination by dynamically oscillating the cantilever in its flexural and/or torsional modes and using oscillation characteristics, such as amplitude, phase, and resonant frequency, to determine the status of the contact, and too provide quantitative data. Static and quasi-static measurements, including contact stiffness and elastic modulus, can be obtained from the thus obtained data. Quasistatic measurements, such as creep and viscoelastic modulus, can be obtained by repeating the static measurements for a number of force profiles at different force application rates and correlating the resultant data using known theories (see A. S. Nowick and B. S. Berry, Anelastic Relaxation in Crystalline Solids, Academy Press, 1972).
Initial contact point Pc can be unambiguously determined by monitoring operation of an oscillating probe because, at the onset of even an extremely small contact force occurring at the beginning of the probe's loading phase of an indentation cycle, measurable change in the resonant properties will be evident, providing a precise indication of initial contact point. Preferably, the probe is driven in so-called “torsional resonance” mode, whereby the cantilever is excited to resonate in torsion and the AFM detects changes in amplitude, phase, or frequency in response to surface interactions. (See U.S. Ser. Nos. 10/189,108 and 10/937,597, each of which is expressly incorporated by reference herein) The motion of the apex of the probe's tip in this mode is typically less than a nanometer, but the torsional resonance has a particularly strong dependence on the frequency, amplitude, and phase changes with tip sample separation.
The actual contact depth hcact can similarly be measured by monitoring interaction between an unloading cantilever and the sample while imparting oscillating relative movement between the probe and the sample. For instance, when torsional resonance is superimposed on an unloading cantilever, a torsional resonant amplitude could develop as soon as the tip has an angstrom-range length of space to oscillate within the indentation, occurring at the release point, Pr. As the tip continues to unload, the average space between the tip and the perimeter of the indentation increases with a resultant change in torsional amplitude or phase. The separation point, Psep, can be detected when the monitored tip oscillation characteristic approaches oscillation in free air, indicating that no portion of the oscillating probe is engaging the indentation perimeter. The actual contact depth hcact can be determined by subtracting the detected separation point, Psep, from the detected release point, Pr. Penetration depth hmax can be determined by subtracting the determined initial contact point Pic from a directly detected probe position at the maximum penetration depth hmax. Contact area Acon can also be determined from the data acquired during the unloading phase of the indentation cycle, provided that the tip is “characterized” i.e., provided that the size and shape of the tip are known so that the surface area of the tip is known. Tip characterization may be achieved, e.g., by direct measurement, and/or by using a reconstruction algorithm that employs a characterizer with a precisely known shape.
These and other features and advantages of the invention will become apparent to those skilled in the art from the following detailed description and the accompanying drawings. It should be understood, however, that the detailed description and specific examples, while indicating preferred embodiments of the present invention, are given by way of illustration and not of limitation. Many changes and modifications may be made within the scope of the present invention without departing from the spirit thereof, and the invention includes all such modifications.
A preferred exemplary embodiment of the invention is illustrated in the accompanying drawings in which like reference numerals represent like parts throughout, and in which:
1. Lateral Force Counteraction
As discussed briefly in the Summary section above, an aspect of the invention lies in the controlled actuation of an “active cantilever” to reduce or eliminate lateral forces on a probe of an AFM or other probe-based instrument when taking mechanical measurements, hence permitting the formation of axially symmetric indents and the accurate determination of applied vertical load. Because the loads are most problematic when taking indentation measurements, an embodiment will now be described in conjunction with an AFM configured to function as an indentation measuring tool. However, the lateral force reduction techniques discussed herein are usable during other measurements and on other instruments as well.
In the presently preferred embodiment, the indentation force is applied through a combination of a conventional z-actuator and an “active cantilever.” The active cantilever could be any number of cantilevers that can be deformed in a controlled manner. It may, for example, be one that deforms under induced thermal stress, one that deforms under electromagnetic forces, one that deforms under ultrasonic pressure, and/or one that deforms under photon pressure. It preferably is piezoelectric composite cantilever, more preferably one that contains a layer of a ZnO piezoelectric film, for instance, between two metal electrodes deposited on a silicon cantilever, thus forming a “bimorph” device. By applying a voltage to the actuator's electrodes, the actuator bends towards or away from the sample surface. Active cantilevers of this type were originally developed for AFMs at Stanford University. Similarly, active cantilevers and control systems are described, for instance, in U.S. Pat. No. 5,317,533 to Quate et al. and U.S. Pat. Nos. 6,672,144 and 6,189,374 to Adderton et al., the disclosures of each of which are hereby incorporated by reference in their entirety.
It has been discovered that an active cantilever on a z position actuator can be controlled to balance the lateral loads imposed on the probe during an indenting operation. Referring again to
Finite element analysis simulations demonstrate the possibility of generating purely vertical forces through lateral force cancellation.
TABLE 1
Forces Generated During Indentation
Vertical
Lateral
Total
Case
Force (nN)
Force (nN)
Force (nN)
1 (FIG. 4a)
825
−1200.0
1456
2 (FIG. 4b)
769
570
957
3 (FIG. 4c)
426
206
474
4 (FIG. 5a)
774
0
774
5 (FIG. 5b)
706
0
706
The lateral forces could be canceled through open loop control of the active cantilever based on known cantilever properties. It is currently preferred, however, to use closed loop control to counteract the unwanted lateral forces. The currently preferred embodiment applies a voltage to at least one of (1) the piezoelectric bimorph of the active cantilever and (2) a separate z position actuator and adjusts the z-piezo voltage according to the variation of cantilever deflection to maintain the angle α of the free end of the cantilever C2 (
Referring now to
As is typical, the optical-based deflection detector 30 includes a laser 50 and a photodetector 52 that interact according to one of the above techniques. The resultant data produce information reflecting vertical and lateral deflection of the cantilever. That information can then be demodulated, either in external analogue or digital circuitry located external to the controller 34 (detailed below), or circuitry within the controller, to obtain information regarding the lateral and vertical positions of the probe, as well as phase information, if the probe 18 is operating in an oscillating mode such as TappingMode operation. When used in conjunction with very small microfabricated cantilevers and piezoelectric positioners as lateral and vertical scanners, AFMs of the type contemplated by the present invention can have resolution down to the molecular level, and can operate with controllable forces small enough to image biological substances.
With further reference to
Controller 34, in response to the error signal, generates a control signal using a feedback controller 35 and transmits the control signal to the piezoelectric z-actuator 16 in order to maintain the angle α of the free end 24 end of the cantilever 20 constant. However, z-piezo actuators are typically nonlinear and have substantial hysteresis. In order to make a precise measurement of vertical position, as is required for quantitative indentation, an independent z-sensor 40 is preferably employed to monitor operation of the z position actuator 16 under feedback. In the preferred embodiment, the sensor 40 is one recently developed by Veeco Instruments that provides an RMS noise floor of <0.05 nm in a 1 kHz bandwidth with a maximum range of 10 μm.
The controller 34 or a separate dedicated controller (not shown) also uses a feedback controller 37 to energize the bimorph element 36 under from the detector 52 to move the probe 18 in the z direction to indent the sample. Indentation is controlled under feedback from the deflection detector 34. Because, the lateral forces imposed on the cantilever 20 remain counteracted during indentation due to the simultaneous control of the z-actuator 16 as discussed above, the force on the sample therefore is a simple function of the indentation feedback voltage applied to the piezoelectric bimorph 36 of the active cantilever 22. If the frame compliance is neglected, the applied force is F=k·S·V, where F is the applied force, k is the cantilever spring constant, S is the piezobimorph sensitivity, and V is the applied voltage.
The controller 34 can determine the initial contact point Pic, the release point Pr, the separation point Psep, the actual contact depth hcact, and contact area Acon from the resultant information as described in greater detail below. Those parameters, in turn, can be used to determine sample properties of interest such as contact stiffness and, plastic deformation, and elastic modulus in a manner which is, per se, well known. These and other properties can then be manipulated further and/or displayed in a display device (not shown) such as a monitor.
It should be noted that, instead of using the bimorph element 36 for indentation control and the z position actuator 16 for lateral force counter feedback control, the roles of these two actuators could be reversed. In that case, the z position actuator 16 will be controlled to maintain the cantilever in a commanded position under feedback, and the bimorph element 36 will be controlled to counteract lateral forces in the cantilever. In addition, it should be understood that the z position actuator 16 could be used to move the sample S rather than the probe 18.
A more sophisticated AFM configured to counteract lateral forces on the probe during indentation is illustrated in
The AFM 110 of this embodiment differs from the AFM of the first embodiment in that it includes an additional XY actuator 112 which can be energized to permit counteraction of forces in the XY plane in order to prevent any movement of the tip in the Y direction or into and out of the page in the drawings. That is, digital or analog circuitry 154 can rely on signals from the detector 150 to determine lateral deflection in the Y direction, and those signals can be compared to a set point of a first feedback controller 135 of the controller 134 to move the XY actuator 112 to prevent movement of the tip in the Y direction during indentation, preferably by keeping a rotational angle of the cantilever free end constant. The same XY actuator 112 can be controlled under feedback to position the probe 118 over the sample S at a desired location for indentation and image acquisition. As with the previous embodiment, a feedback controller 135′ within the controller 134 also transmits a control signal to the z actuator 116 under feedback from the detector 152 to maintain the angle of the end of cantilever 120 constant, while an additional controller 137 is activated under feedback to indent the sample S under feedback. Also as in the previous embodiment, it should be understood that one or both of the actuators 112 and 116 could be used to move the sample S rather than the probe 118.
Referring to
During the indentation process, Loop 202 proceeds from START in Block 206 to Block 208 to measure the position of a portion of the probe assembly, preferably the deflection of the cantilever's free end. Loop 202 then proceeds to Block 210, where the cantilever deflection is compared with a desired setpoint, and an error signal is generated that preferably is proportional to the difference between the detected deflection and the setpoint deflection. Again, this deflection is indicative of cantilever free end angle, but need not be a direct measurement of the angle. Loop 202 then proceeds to Block 212, where the controller causes a voltage to be delivered to the XY actuator and/or the z actuator to minimize or null the error signal, hence maintaining the cantilever deflection constant despite changes in probe-sample spacing and tip depth penetration during the indenting process. The lateral forces on the cantilever 20 therefore are counteracted. Loop 202 then returns to Block 208, where the operations of Blocks 200 and 202 are repeated on a continuous basis.
Loop 204 also proceeds from START 206 and then proceeds to Block 214, where voltage is applied to the cantilever's piezoelectric element to move the probe toward the sample and generate a force on the sample to ultimately generate a commanded force profile F(t). Due to the counteraction of lateral forces on the probe using the Loop 202, the force imposed on the sample is a simple function of the known voltage applied to the piezoelectric bimorph element. The Loop 204 then proceeds to Block 216, where the z position of the probe assembly is determined using the z-position sensor, hence providing the z position information required to obtain force vs. position data for that point on the profile. The Loop 204 then checks in Block 218 to determine whether the profiling process is complete, and, if not, cycles through Blocks 214, 216, and 218 until the profile is complete. The resultant data can be used as generally denoted by Block 220, e.g., to determine any of a number of sample characteristics, some of which are discussed below. This information can be displayed directly and/or combined with other properties of the sample to determine other sample properties. The probe assembly is then moved away from the sample and, if desired, repositioned over another point on the sample surface, where the process 200 is repeated.
A more generalized alternative process 230 for controlling either the AFM 10 of
As with the process 200, after the indentation cycle is complete, the processes of loops 236 and 238 can be repeated as many times as is needed to generate a force profile (see inquiry Block 250) useful for quasistatic measurements such as creep and viscoelastic modulus, whereupon the process 230 proceeds to End in Block 252.
2. Quantified Material Property Measurements
As discussed above, dynamic and quasistatic measurements can be combined to unambiguously determine the initial contact point Pic, actual contact depth hcact, and other parameters of the indentation. These measurements are taken during the “loading phase” of the indentation cycle in which the tip is driven into and indents the sample surface and the subsequent “unloading phase” in which the tip is withdrawn from the sample surface. The preferred technique involves monitoring probe response while imparting oscillating movement between the tip and the sample during the loading phase of the indentation cycle to determine the initial contact point Pic and during the unloading phase to determine actual contact depth hcact.
Particularly during the loading phase, the relative movement could be a relative vertical movement caused, e.g., by exciting the probe to oscillate about the z-axis in flexural resonance. The initial contact point Pic is then detected by detecting a change in probe operation occurring as a result of tip-sample interaction occurring at the contact point. A possible operational mode is TappingMode, in which the probe is driven to oscillate at or near its resonance flexural frequency while the probe/sample spacing is decreased under feedback and a change in probe oscillation amplitude and/or frequency indicative of sample contact is detected.
It is currently preferred, however, that relative lateral oscillating movement be used as a source of both contact point detection and contact depth detection. Relative lateral movement could be made by shaking the sample and/or the probe as a whole along one or both axes of the XY plane in a manner that is, per se, well known. The preferred technique, however, utilizes torsional resonance or TR-Mode™ mode, which was recently commercialized by Veeco Instruments, Inc. In TR-Mode, a cantilever is excited to resonate at a torsional resonance, and a change in amplitude, phase or frequency in response to surface interactions is detected. (Torsional resonance imaging is discussed, for example, in U.S. patent application Ser. Nos. 10/189,108 and 10/937,597 filed Jul. 2, 2002 and Sep. 9, 2004, respectively, the subject matter of which is hereby incorporated by resonance in its entirety). The motion of the apex A of the tip T in TR mode is typically less than 1 nm, but the torsional resonance has a particularly strong dependence on the frequency, amplitude, and phase changes with tip-sample separation, permitting extremely precise detection of initial tip/sample interaction during the loading phase and initial separation during the unloading phase. The Q of TR mode is also very high, typically 1,000 to 2,000. As a result, the tip-sample interaction force, which is inversely proportional Q, does not deter the unloading deformation process in the vertical z direction. Both initial contact point determination and actual contact depth determination will now be described in greater detail.
As seen in
Penetration depth Pmax, can be determined by monitoring the position of the probe at the juncture between the loading and unloading phase, taking frame compliance into account in a known manner. The maximum applied force can also be measured in a conventional manner at this time, hence permitting determinations of ΔP and Δh for contact stiffness determination.
Determining onset of the contact peak fc during tip withdrawal provides an indication of the release point, Pr, and, accordingly, a bottom limit of the actual contact depth, hact, and determining the duration of the contact peak fc provides an indication of contact area.
This effect is illustrated schematically in
Contact resonance evolution as the tip moves towards and indents the sample during progressive zones of the loading phase of the indentation process is illustrated by
As the tip is withdrawn from the sample as seen in
Three possible approaches to acquiring tip shape are well established and practiced either in commercial applications or scientific researches. A first approach is to directly characterize of tip using other imaging such as scanning electron microscopy. In this case the outline of the tip shape is mapped by a fine electron beam with the resolution of a few nanometers (see P. Grutter et al, APPLIED PHYSICS LETTERS 60 (22): 2741-2743 Jun. 1, 1992, L. Montelius et al APPLIED PHYSICS LETTERS 62 (21): 2628-2630 May 24, 1993, the subject matter of which is hereby incorporated by reference.)
A second approach is to indent the tip on a sample with perfect plastic deformation. In this case the plastic deformation of the indent provides a template of the tip shape. A sharper tip or other means of observation such as electron microscopy, AFM with a sharper tip are used to create surface image of the crater. The same indentation load/displacement curve on a perfectly plastically deformable sample can also be fitted by so called “area function” to give a best guess of the tip shape. Typically, a series of indents are applied to the reference material over a relatively large range of maximum loads and maximum penetration depths, hence permitting a measurement of the cross sectional area of the indenter tip as a function of the distance from the apex. This method has been used by Oliver and Pharr (see reference JOURNAL OF MATERIALS RESEARCH 7 (3): 613-617 MARCH 1992, the subject matter of which is hereby incorporated by reference.)
A third approach uses blind reconstruction of tip topographic image through interacting tip with sharper features and using a morphological dilation method to reconstruct the tips shape (Su et al ULTRAMICROSCOPY 97 (1-4): 135-144 OCTOBER-NOVEMBER 2003; Atamny et al SURFACE SCIENCE 323 (3): L314-L318 Jan. 20, 1995, the subject matter of which is hereby incorporated by reference.) The advantage of this approach is that the tip shape calibration can be performed in-situ by the AFM and the resolution can be better than the previous two methods. A disadvantage is that the interaction of the tip with sharp feature may be destructive, and great care need be taken in the imaging process, as discussed in the publication.
At the end of these processes, contact stiffness S can be determined from the detected peak pressure Pmax and the determined penetration depth hmax as determined by subtracting Pic from Pmax using a variant equation (7) as derived above:
The elastic modulus of the material Esample can then be determined using equation as derived above:
Esample=(1−c2)/((2√{square root over (Acom)}/S√{square root over (π)}−(1−c2)/Etip)) (8)
Creep, a quasistatic measurement, then can made by measuring plastice deformation for a number of force application rates and by correlating those measurements using constitutive equations shown in the reference of Nowick and Berry (Anelastic Relaxation in Crystalline Solids, the subject matter of which is hereby incorporated by reference.) Viscoelastic modulus can similarly be determined by measuring the sample's elastic modulus for a number of force application rates and by correlating those measurements using the same theory.
A generalized flowchart illustrating a process 330 for obtaining these measurements is illustrated in
The data acquisition loop 356 will now be discussed in more detail.
The data acquisition loop 356 begins in Block 358, where an xy position actuator and/or a z position actuator are controlled and the probe is driven to oscillate in the manner required to obtain data as discussed above, e.g., in connection with
Although the best mode contemplated by the inventors of carrying out the present invention is disclosed above, practice of the present invention is not limited thereto. It will be manifest that various additions, modifications and rearrangements of the features of the present invention may be made without deviating from the spirit and scope of the underlying inventive concept. The scope of still other changes to the described embodiments that fall within the present invention but that are not specifically discussed above will become apparent from the appended claims and other attachments.
Prater, Craig, Su, Chanmin, Phan, Nghi
Patent | Priority | Assignee | Title |
10527397, | Dec 27 2017 | Mitutoyo Corporation | Cooperative measurement gauge system for multiple axis position measurement |
8006316, | Aug 01 2006 | IONSCOPE LIMITED | Scanning ion conductance microscopy for the investigation of living cells |
Patent | Priority | Assignee | Title |
4699000, | Apr 17 1986 | LECO CORPORATION, A MI CORP | Automated device for determining and evaluating the mechanical properties of materials |
5077473, | Jul 26 1990 | VEECO METROLOGY INC | Drift compensation for scanning probe microscopes using an enhanced probe positioning system |
5193383, | Jul 11 1990 | The United States of America as represented by the Secretary of the Navy; UNITED STATES OF AMERICA, THE, AS REPRESENTED BY THE SECRETARY OF THE NAVY | Mechanical and surface force nanoprobe |
5266801, | Jun 05 1989 | BRUKER NANO, INC | Jumping probe microscope |
5317533, | Jan 22 1988 | BOARD OF TRUSTEES OF THE LELAND STANFORD JUNIOR UNIVERSITY, THE | Integrated mass storage device |
5400647, | Nov 12 1992 | BRUKER NANO, INC | Methods of operating atomic force microscopes to measure friction |
5412980, | Aug 07 1992 | BRUKER NANO, INC | Tapping atomic force microscope |
5515719, | May 19 1994 | Agilent Technologies, Inc | Controlled force microscope for operation in liquids |
5519212, | Aug 07 1992 | BRUKER NANO, INC | Tapping atomic force microscope with phase or frequency detection |
5553486, | Oct 01 1993 | Hysitron Incorporated | Apparatus for microindentation hardness testing and surface imaging incorporating a multi-plate capacitor system |
5866807, | Feb 04 1997 | BRUKER NANO, INC | Method and apparatus for measuring mechanical properties on a small scale |
5959200, | Aug 27 1997 | The Board of Trustees of the Leland Stanford Junior University | Micromachined cantilever structure providing for independent multidimensional force sensing using high aspect ratio beams |
6349591, | Jan 13 2000 | Universite Pierre & Marie Curie | Device and method for controlling the interaction of a tip and a sample, notably for atomic force microscopy and nano-indentation |
6672144, | Mar 29 1999 | BRUKER NANO, INC | Dynamic activation for an atomic force microscope and method of use thereof |
6755075, | Feb 10 2000 | Japanese Science and Technology Corporation; National Institute for Materials Science | Ultra micro indentation testing apparatus |
20020121131, | |||
20060243036, | |||
RE34489, | Jun 04 1992 | Regents of the University of California, The | Atomic force microscope with optional replaceable fluid cell |
WO46569, |
Executed on | Assignor | Assignee | Conveyance | Frame | Reel | Doc |
Apr 14 2005 | Veeco Instruments, Inc. | (assignment on the face of the patent) | / | |||
Jul 06 2005 | SU, CHANMIN | Veeco Instruments INC | ASSIGNMENT OF ASSIGNORS INTEREST SEE DOCUMENT FOR DETAILS | 016970 | /0550 | |
Jul 06 2005 | PHAN, NGHI | Veeco Instruments INC | ASSIGNMENT OF ASSIGNORS INTEREST SEE DOCUMENT FOR DETAILS | 016970 | /0550 | |
Jul 06 2005 | PRATER, CRAIG | Veeco Instruments INC | ASSIGNMENT OF ASSIGNORS INTEREST SEE DOCUMENT FOR DETAILS | 016970 | /0550 | |
Sep 28 2010 | Veeco Instruments INC | VEECO METROLOGY INC | ASSIGNMENT OF ASSIGNORS INTEREST SEE DOCUMENT FOR DETAILS | 025051 | /0290 | |
Oct 07 2010 | VEECO METROLOGY INC | BRUKER NANO, INC | CHANGE OF NAME SEE DOCUMENT FOR DETAILS | 027111 | /0461 |
Date | Maintenance Fee Events |
May 17 2013 | REM: Maintenance Fee Reminder Mailed. |
Sep 20 2013 | M1551: Payment of Maintenance Fee, 4th Year, Large Entity. |
Sep 20 2013 | M1554: Surcharge for Late Payment, Large Entity. |
Mar 24 2017 | M1552: Payment of Maintenance Fee, 8th Year, Large Entity. |
Apr 05 2021 | M1553: Payment of Maintenance Fee, 12th Year, Large Entity. |
Date | Maintenance Schedule |
Oct 06 2012 | 4 years fee payment window open |
Apr 06 2013 | 6 months grace period start (w surcharge) |
Oct 06 2013 | patent expiry (for year 4) |
Oct 06 2015 | 2 years to revive unintentionally abandoned end. (for year 4) |
Oct 06 2016 | 8 years fee payment window open |
Apr 06 2017 | 6 months grace period start (w surcharge) |
Oct 06 2017 | patent expiry (for year 8) |
Oct 06 2019 | 2 years to revive unintentionally abandoned end. (for year 8) |
Oct 06 2020 | 12 years fee payment window open |
Apr 06 2021 | 6 months grace period start (w surcharge) |
Oct 06 2021 | patent expiry (for year 12) |
Oct 06 2023 | 2 years to revive unintentionally abandoned end. (for year 12) |